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Definition (Idempotent And Nilpotent)
Let $R$ be a ring.
- We say that $a$ is an idempotent of $R$ if $a^2=a$.
- We say that $a$ is nilpotent if $a^n=0$ for some integer $n$.
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Please Login to access more options. Definition (Idempotent And Nilpotent)Let $R$ be a ring.
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